Extrapolation of solvability of the parabolic Lp Neumann problem on bounded Lipschitz cylinders

Abstract

A recent result of the first author with Li and Pipher has established the extrapolation of solvability of the Lp parabolic Neumann problem on unbounded graph domains of the form Ω=\(x',xn):\,xn>φ(x')\× R, where φ: Rn-1 R is a Lipschitz function. The result shows that under the assumptions that the Lp parabolic Neumann problem for the equation Lu=-∂t u+div(A∇ u)=0 in Ω and also the Lp' parabolic Dirichlet problem for the adjoint equation L*u=∂t u+div(A∇ u)=0 in Ω are solvable, then also the Lq parabolic Neumann problem for the equation Lu=0 in Ω is solvable for all 1<q<p. However the mentioned paper does not answer the question whether the same claim is also true for domains of the form O× R, where O is a bounded Lipschitz domain (in spatial variables) since this case does not follow from our argument for the unbounded case. Indeed, the bounded Lipschitz cylinder case requires a significantly different approach which we present in this article and establish an analogous result when O is a bounded Lipschitz domain.

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